A particle-based method using the mesh-constrained discrete point approach for two-dimensional Stokes flows

IF 0.4 Q4 ENGINEERING, MECHANICAL Mechanical Engineering Journal Pub Date : 2022-05-16 DOI:10.1299/mej.22-00204
Takeharu Matsuda, Kohsuke Tsukui, Satoshi Ii
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引用次数: 1

Abstract

Meshless methods inherently do not require mesh topologies and are practically used for solving continuum equations. However, these methods generally tend to have a higher computational load than conventional mesh-based methods because calculation stencils for spatial discretization become large. In this study, a novel approach for the use of compact stencils in meshless methods is proposed, called the mesh-constrained discrete point (MCD) approach. The MCD approach introduces a Cartesian mesh system to the background of a domain. And the approach rigorously constrains the distribution of discrete points (DPs) in each mesh by solving a dynamic problem with nonlinear constraints. This can avoid the heterogeneity of the DP distribution at the mesh-size level and impose compact stencils with a fixed degree of freedom for derivative evaluations. A fundamental formulation for arrangements of DPs and an application to unsteady Stokes flows are presented in this paper. Numerical tests were performed for the distribution of DPs and flow problems in co-axial and eccentric circular channels. The proposed MCD approach achieved a reasonable distribution of DPs independently of the spatial resolution with a few iterations in pre-processing. Additionally, solutions using the obtained DP distributions in Stokes flow problems were in good agreement with theoretical and reference solutions. The results also confirmed that the numerical accuracies of velocity and pressure achieved the expected convergence order, even when compact stencils were used.
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基于粒子的二维Stokes流网格约束离散点方法
无网格方法本质上不需要网格拓扑,并且实际用于求解连续体方程。然而,这些方法通常比传统的基于网格的方法具有更高的计算负载,因为用于空间离散化的计算模板变得很大。在这项研究中,提出了一种在无网格方法中使用紧凑模板的新方法,称为网格约束离散点(MCD)方法。MCD方法将笛卡尔网格系统引入到域的背景中。该方法通过求解具有非线性约束的动态问题,严格约束离散点在每个网格中的分布。这可以避免DP分布在网格尺寸水平上的异质性,并为导数评估施加具有固定自由度的紧凑模板。本文给出了DP排列的基本公式及其在非定常Stokes流中的应用。对同轴和偏心圆形通道中DP的分布和流动问题进行了数值试验。所提出的MCD方法在预处理中进行了几次迭代,实现了与空间分辨率无关的DP的合理分布。此外,在Stokes流问题中使用所获得的DP分布的解与理论解和参考解非常一致。结果还证实,即使使用紧凑的模板,速度和压力的数值精度也达到了预期的收敛级。
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来源期刊
Mechanical Engineering Journal
Mechanical Engineering Journal ENGINEERING, MECHANICAL-
自引率
20.00%
发文量
42
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